Implementation of the algorithm for the Koch snowflake #4207
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| """ | ||
| Description | ||
| The Koch snowflake is a fractal curve and one of the earliest fractals to | ||
| have been described. The Koch snowflake can be built up iteratively, in a | ||
| sequence of stages. The first stage is an equilateral triangle, and each | ||
| successive stage is formed by adding outward bends to each side of the | ||
| previous stage, making smaller equilateral triangles. | ||
| This can be achieved through the following steps for each line: | ||
| 1. divide the line segment into three segments of equal length. | ||
| 2. draw an equilateral triangle that has the middle segment from step 1 | ||
| as its base and points outward. | ||
| 3. remove the line segment that is the base of the triangle from step 2. | ||
| (description adapted from https://en.wikipedia.org/wiki/Koch_snowflake ) | ||
| (for a more detailed explanation and an implementation in the | ||
| Processing language, see https://natureofcode.com/book/chapter-8-fractals/ | ||
| #84-the-koch-curve-and-the-arraylist-technique ) | ||
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| Requirements(pip) | ||
| - numpy | ||
| - matplotlib | ||
| """ | ||
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| from __future__ import annotations | ||
| import numpy | ||
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| # initial triangle of Koch snowflake | ||
| VECTOR1 = numpy.array([0, 0]) | ||
| VECTOR2 = numpy.array([0.5, 0.8660254]) | ||
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| VECTOR3 = numpy.array([1, 0]) | ||
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| INITIAL_VECTORS = [VECTOR1, VECTOR2, VECTOR3, VECTOR1] | ||
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| # uncomment for simple Koch curve instead of Koch snowflake | ||
| # INITIAL_VECTORS = [VECTOR1, VECTOR3] | ||
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| def iterate(initial_vectors: list[numpy.ndarray], steps: int) -> list[numpy.ndarray]: | ||
| """ | ||
| Go through the number of iterations determined by the argument "steps". | ||
| Be careful with high values (above 5) since the time to calculate increases | ||
| exponentially. | ||
| >>> iterate([numpy.array([0, 0]), numpy.array([1, 0])], 1) | ||
| [array([0, 0]), array([0.33333333, 0. ]), array([0.5 , \ | ||
| 0.28867513]), array([0.66666667, 0. ]), array([1, 0])] | ||
| """ | ||
| vectors = initial_vectors | ||
| for i in range(steps): | ||
| vectors = iteration_step(vectors) | ||
| return vectors | ||
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| def iteration_step(vectors: list[numpy.ndarray]) -> list[numpy.ndarray]: | ||
| """ | ||
| Loops through each pair of adjacent vectors. Each line between two adjacent | ||
| vectors is divided into 4 segments by adding 3 additional vectors in-between | ||
| the original two vectors. The vector in the middle is constructed through a | ||
| 60 degree rotation so it is bent outwards. | ||
| >>> iteration_step([numpy.array([0, 0]), numpy.array([1, 0])]) | ||
| [array([0, 0]), array([0.33333333, 0. ]), array([0.5 , \ | ||
| 0.28867513]), array([0.66666667, 0. ]), array([1, 0])] | ||
| """ | ||
| new_vectors = [] | ||
| for i in range(len(vectors) - 1): | ||
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| start_vector = vectors[i] | ||
| end_vector = vectors[i + 1] | ||
| new_vectors.append(start_vector) | ||
| difference_vector = end_vector - start_vector | ||
| new_vectors.append(start_vector + difference_vector / 3) | ||
| new_vectors.append( | ||
| start_vector + difference_vector / 3 + rotate(difference_vector / 3, 60) | ||
| ) | ||
| new_vectors.append(start_vector + difference_vector * 2 / 3) | ||
| new_vectors.append(vectors[-1]) | ||
| return new_vectors | ||
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| def rotate(vector: numpy.ndarray, angle_in_degrees: float) -> numpy.ndarray: | ||
| """ | ||
| Standard rotation of a 2D vector with a rotation matrix | ||
| (see https://en.wikipedia.org/wiki/Rotation_matrix ) | ||
| >>> rotate(numpy.array([1, 0]), 60) | ||
| array([0.5 , 0.8660254]) | ||
| >>> rotate(numpy.array([1, 0]), 90) | ||
| array([6.123234e-17, 1.000000e+00]) | ||
| """ | ||
| theta = numpy.radians(angle_in_degrees) | ||
| c, s = numpy.cos(theta), numpy.sin(theta) | ||
| rotation_matrix = numpy.array(((c, -s), (s, c))) | ||
| return numpy.dot(rotation_matrix, vector) | ||
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| def plot(vectors: list[numpy.ndarray]) -> None: | ||
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There was a problem hiding this comment. As there is no test file in this pull request nor any test function or class in the file There was a problem hiding this comment. As there is no test file in this pull request nor any test function or class in the file There was a problem hiding this comment. As there is no test file in this pull request nor any test function or class in the file |
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| import matplotlib.pyplot as plt # type: ignore | ||
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| # avoid stretched display of graph | ||
| axes = plt.gca() | ||
| axes.set_aspect("equal") | ||
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| # matplotlib.pyplot.plot takes a list of all x-coordinates and a list of all | ||
| # y-coordinates as inputs, which need to be constructed from our vector-list | ||
| x_coordinates = [] | ||
| for vector in vectors: | ||
| x_coordinates.append(vector[0]) | ||
| y_coordinates = [] | ||
| for vector in vectors: | ||
| y_coordinates.append(vector[1]) | ||
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There was a problem hiding this comment. Please make these There was a problem hiding this comment. Or maybe even slicker, use |
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| plt.plot(x_coordinates, y_coordinates) | ||
| plt.show() | ||
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| if __name__ == "__main__": | ||
| import doctest | ||
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| doctest.testmod() | ||
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| processed_vectors = iterate(INITIAL_VECTORS, 5) | ||
| plot(processed_vectors) | ||
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Variable and function names should follow the
snake_casenaming convention. Please update the following name accordingly:VECTOR1